The Kobe Port Tower is a hyperbolic telecommunications tower in Kobe, Japan. It has a cross section that is a hyperbola. The height of the tower is 108 meters and the narrowest point is 65.5 meters above the ground. At that narrowest point the tower is only 8.2 meters wide. The diameter of the base of the tower is 25 meters. Use this information to place a hyperbola in a coordinate system and reason out its equation. Show all work on this page.
The Kobe Port Tower is a hyperbolic telecommunications tower in Kobe, Japan. It has a cross section that is a hyperbola. The height of the tower is 108 meters and the narrowest point is 65.5 meters above the ground. At that narrowest point the tower is only 8.2 meters wide. The diameter of the base of the tower is 25 meters. Use this information to place a hyperbola in a coordinate system and reason out its equation. Show all work on this page.
The Kobe Port Tower is a hyperbolic telecommunications tower in Kobe, Japan. It has a cross section that is a hyperbola. The height of the tower is 108 meters and the narrowest point is 65.5 meters above the ground. At that narrowest point the tower is only 8.2 meters wide. The diameter of the base of the tower is 25 meters. Use this information to place a hyperbola in a coordinate system and reason out its equation. Show all work on this page.
The Kobe Port Tower is a hyperbolic telecommunications tower in Kobe, Japan. It has a cross section that is a hyperbola. The height of the tower is 108 meters and the narrowest point is 65.5 meters above the ground. At that narrowest point the tower is only 8.2 meters wide. The diameter of the base of the tower is 25 meters. Use this information to place a hyperbola in a coordinate system and reason out its equation. Show all work on this page.
System that uses coordinates to uniquely determine the position of points. The most common coordinate system is the Cartesian system, where points are given by distance along a horizontal x-axis and vertical y-axis from the origin. A polar coordinate system locates a point by its direction relative to a reference direction and its distance from a given point. In three dimensions, it leads to cylindrical and spherical coordinates.
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